Geometrical characterization of semilinear isomorphisms of vector spaces and semilinear homeomorphisms of normed spaces

Abstract

Let V and V' be vector spaces over division rings (possible infinite-dimensional) and let P(V) and P(V') be the associated projective spaces. We say that f: P(V) P(V') is a PGL- mapping if for every h∈ PGL(V) there exists h'∈ PGL(V') such that fh=h'f. We show that for every PGL-bijection the inverse mapping is a semicollineation. Also, we obtain an analogue of this result for the projective spaces associated to normed spaces.